数学                        
                
                                
                        
                            闵可夫斯基空间                        
                
                                
                        
                            有限元法                        
                
                                
                        
                            Dirichlet问题                        
                
                                
                        
                            边值问题                        
                
                                
                        
                            离散化                        
                
                                
                        
                            操作员(生物学)                        
                
                                
                        
                            数学分析                        
                
                                
                        
                            Dirichlet边界条件                        
                
                                
                        
                            应用数学                        
                
                                
                        
                            放松(心理学)                        
                
                                
                        
                            几何学                        
                
                                
                        
                            物理                        
                
                                
                        
                            心理学                        
                
                                
                        
                            社会心理学                        
                
                                
                        
                            生物化学                        
                
                                
                        
                            化学                        
                
                                
                        
                            抑制因子                        
                
                                
                        
                            基因                        
                
                                
                        
                            转录因子                        
                
                                
                        
                            热力学                        
                
                        
                    
            作者
            
                Hao Liu,Shingyu Leung,Jianliang Qian            
         
                    
            出处
            
                                    期刊:Cornell University - arXiv
                                                                        日期:2023-01-01
                                                                
         
        
    
            
            标识
            
                                    DOI:10.48550/arxiv.2307.16497
                                    
                                
                                 
         
        
                
            摘要
            
            The classical Minkowski problem for convex bodies has deeply influenced the development of differential geometry. During the past several decades, abundant mathematical theories have been developed for studying the solutions of the Minkowski problem, however, the numerical solution of this problem has been largely left behind, with only few methods available to achieve that goal. In this article, focusing on the two-dimensional Minkowski problem with Dirichlet boundary conditions, we introduce two solution methods, both based on operator-splitting. One of these two methods deals directly with the Dirichlet condition, while the other method uses an approximation of this Dirichlet condition. This relaxation of the Dirichlet condition makes this second method better suited than the first one to treat those situations where the Minkowski and the Dirichlet condition are not compatible. Both methods are generalizations of the solution method for the canonical Monge-Amp\`{e}re equation discussed by Glowinski et al. (Journal of Scientific Computing, 79(1), 1-47, 2019); as such they take advantage of a divergence formulation of the Minkowski problem, well-suited to a mixed finite element approximation, and to the the time-discretization via an operator-splitting scheme, of an associated initial value problem. Our methodology can be easily implemented on convex domains of rather general shape (with curved boundaries, possibly). The numerical experiments we performed validate both methods and show that if one uses continuous piecewise affine finite element approximations of the smooth solution of the Minkowski problem and of its three second order derivatives, these two methods provide nearly second order accuracy for the $L^2$ and $L^{\infty}$ error. One can extend easily the methods discussed in this article, to address the solution of three-dimensional Minkowski problem.
         
            
 
                 
                
                    
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